Many infectious diseases such as dengue,
malaria, typhoid and hepatitis produce
characteristic variations in the composition of
blood [1] . These variations can be a characteristic
change in number, size or shape of certain blood
cells. For example, in anaemia, the red blood cell
(RBC) count is reduced [1]. Other diseases may
cause changes in the chemical composition of the
blood serum and other body fluid, like the
characteristically elevated in size and shape, or a
chemical analysis of the blood serum can,
therefore, provide important information for the
diagnosis of such diseases [1]. Similarly, other
body fluids, smears, and small samples of live

tissue, obtained by biopsy, are studied through the
technique of bacteriology, serology and histology
to obtain clues for the diagnosis of diseases.
However, these techniques are invasive because
the bacteriology, serology and histology diagnosis
requires the sample of human‟s smear from the
throat, blood and tissue respectively. The latest
commercial technique takes two hours to detect
dengue fever by serological confirmation using
samples of serum, plasma or heparinized whole
blood [1]. This test is still invasive and expensive
and can only be performed by trained medical
personnel.
Dengue fever (DF) ranks highly among the newly
emerging infectious diseases in public health
significance. Hence it is considered to be the most
important of the arthropod-borne viral diseases. In
Malaysia, the disease is endemic but major
outbreaks seem to occur at least once in every four
years [1]. Dengue fever was first reported in
Malaysia after an epidemic in Penang in 1902 [2,
3]. Since the early 1970s, the World Health
Organization (WHO) has been actively involved in
developing and promoting strategies for treatment
and control of dengue. In 1997, WHO published a
second guide to the diagnosis, treatment and
control of dengue haemorrhagic fever [4]. Dengue
were reported throughout the year and started to
increase from 1997 to 1998. In 1998, 27,373
dengue cases with 58 deaths were reported as
compared to 19,544 cases with 50 deaths in 1997.
This has shown an increase of 7,829 cases or
40.1% over the number of cases in 1997 [5].
H.Adbul Rahim,F.Ibrahim,M.N.Taib, Int. J. Comp. Tech. Appl., Vol 2 (1), 207-215
207
ISSN: 2229-6093
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Therefore, accurate classification of dengue
infection a very useful tool for doctors in
diagnosing diseases early.
Fatimah et. al. [6] describe a noninvasive
prediction system for predicting the day of
defervescence of fever in dengue patients using
ANN. The developed system bases its prediction
solely on clinical symptoms and signs and the
results show that around 90% prediction accuracy.
This paper describes a noninvasive
classification system for dengue infections using
NAR models. The rest of the paper is structured
as follows: Section 2 gives a brief review of
system identification. In Section 3 nonlinear
autoregressive (NAR) model is presented.
Methods are provided in Section 4. In Section 5
shows the results. Finally, concluding remarks
and discussions are presented in Section 6.

2. System identification

This section describes the general methodology
conducted for classifying the dengue infections
disease as shown in a flowchart in Figure 1 which
consists of five stages.
The first stage began with the data collection
on the dengue disease. Then a suitable structure
will be selected to match the dynamics of the data.
The Levenberg-Marquardt algorithm is used to
train the ANN. At the fourth stage, ROC analysis
was applied to illustrate the sensitivity, the
specificity and the AUC percentage of the
appropriate model.
It is a common practice in various scientific
and engineering disciplines to represent observed
discrete time random processes by autoregressive
(AR) models.
A fundamental problem in system
identification is the choice of the nature of the
model which should be used for the system under
study. Some of the problems in system
identification are:
i) determining the order of the model
ii) selection of a suitable criterion for
determining the accuracy of the model
iii) designing an input signal which will
maximize the accuracy of the estimates of
the parameter of the model.
Usually, the parameter estimation is carried out
by least squares or maximum likehood procedures
[7]. An important part of statistical inference deals
with model order selection. Several criteria have
been proposed as subjective bases for selecting of
the system identification model order. A
technique based on the prediction error variance,
the Final prediction error (FPE) was developed by
Akaike. Akaike also proposed another well-
known criterion, Akaike‟s Information Criterion
(AIC), that is derived from information theoretic
concepts. To determine the model order, the
approach, ranges from the classical based on the
estimated residuals of the fitting model [8] to those
founded on information [9] and coding theory [10]
of Bayesian analysis [11, 12]. The determination
of the order and estimation of the parameters of
the models is the primary concern here. The
problem of determination of suitable structure and
order of the system from its input/output data has
several workable solutions, especially linear
system.
The choice of linear system and model
structures are the most critical task in any
identification methodology. An alternative to the
modeling techniques of linear systems is the
implementation of computational intelligent,
which is mostly based on Artificial Neural
Networks (ANN). The vast development of ANN
in the last few years, led to the use of ANN in
system identification. Narenda and Parthasarathy
[13] proposed that ANN should be used in
conjunction with system theory in the
development of realizable models.

3. Nonlinear Autoregressive Model

The NAR model consists of an autoregressive
which is represented as past output data and the
nonlinear function was selected as hyperbolic
tangent.

)] ( ), ( ),..., 1 ( [ ) ( ˆ t u n t y t y F t y
y
÷ ÷ = (1)

where F is a nonlinear part, y(t) and u(t) represent
the output and input, respectively. n
y
is the
associated maximum lags. Block diagram for
NAR model is as shown in Figure 2.
Figure 3 shows how a feedforward ANN can be
configured as a NAR model. The function F in
Equation 1 is realized by a feedforward network,
the predictor will have a feedback when the
regressors are selected as in an AR model. The
equation for the predictor has the form:

Model order selection is dependent upon the
quality of the model since the model order is
varied and the cost function is monitored. A
useful measure to aid this procedure is to measure
the significance of each additional model.
Assessing the significance of each model is not
only necessary for model order selection but also
for further analysis of the estimated model and can
aid the design and analysis of medical
applications. In this research we used Lipschitz
number.
He and Asada [14] introduced Lipschitz
number method for the estimation of the model
order of nonlinear input-output models. The
approach is based on the continuity property of
nonlinear functions, which represents input-output
models of continuous dynamic systems. By
evaluating the modification of an index, which is
defined as Lipschitz number with successive
modification of the model orders, the appropriate
model orders can be determined more simply and
reliably.

3.2 Model Estimation

The third step is model estimation, which
involves determining the numerical values of the
structural parameters, which minimise the error
between the system to be identified, and its model.
In this research we used LM algorithm.
The MLP may be taught to perform a specific
function through a process called training. The
training process is performed using a set of guided
weight update rules. In this thesis, the LM
algorithm was chosen as the training algorithm.
This section presents the LM algorithm in detail.

3.3 Regularization

If the network has been trained to a very small
value of criterion, the model needs not be
particularly good. A good performance on the
training set does not automatically imply that the
model generalizes well to new inputs. In
particular, it was shown that if the model structure
was too large (contained many weights) it led to
overfitting [15], that is, the noise in the training set
was also modelled. The average generalization
error was introduced as a quantity assessing a
given model structure. One way of controlling the
average generalization error was to extend the
criterion with a term called regularization by
simple weight decay [15]. The weight decay
reduced the variance error at the expense of a
higher bias error.

3.4 Model Validation

Receiver operating characteristic (ROC) curves
are commonly used in medicine and healthcare
[16], where they are used to quantify the accuracy
of diagnostic tests [17, 18]. The performance of
an “expert” human or machine, can be represented
objectively by ROC curves [19]. Such curves
show, for example, the trade-off between a
diagnostic test correctly identifying diseased
patients as diseased, rather than healthy, versus
correctly identifying healthy patients as healthy,
rather than diseased. Terms commonly used in
ROC curves are sensitivity, specificity and
diagnostic accuracy, to show the accuracy of the
designed system.
ROC curves display the relationship between
sensitivity (true positive rate) and 1-specificity
(false positive rate) across all possible threshold
values that define the positivity of a disease. They
show the full picture trade-off between true
positive rate and false positive rate at different
levels of positivity.
The ANN must be trained before the ROC
curve can be generated. The resulting network is
referred to as a “basic trained network”. This
initial instance of the ANN provides one operating
point. The result is a set of instances of the
network chosen to represent a point on the ROC
curve. The goodness of this set of network
instances are then evaluated using separate test
data.
Table 1 shows a diagnostic accuracy results
after training the ANN. The decision variable can
produce two sets of values, which represents two
category types dengue infection. The true dengue
infection is denoted as D+, whereas the false
dengue infection is indicated as D-.
In general, four possible decisions and two
types of errors are made when comparing a test
result with a diagnosis, as shown in Table 1. If
both diagnosis and test are positive, it is called a
true positive (TP). The probability of the TP to
occur is estimated by counting the true positives in
the sample and dividing by the sample size. If the
diagnosis is positive and the test is negative it is
called a false negative (FN). False positive (FP)
and true negative (TN) are defined similarly. The
two sets of values produced in the threshold are
the total positive and negative indicated as T+ and
T-.
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Sensitivity and specificity are the basic
measures of the accuracy of the diagnostic test.
They describe the abilities of the test to enable one
to correctly diagnose disease when the disease is
actually present and to correctly rule out disease
when it is truly absent.
The accuracy of a test is measured by
comparing the results of the test to the true disease
status of the patient. Sensitivity and specificity
depend on the threshold (also known as „operating
point‟ or „cut point‟) used to define positive and
negative test results. As the threshold level
decreases, the sensitivity increases while the
specificity decreases, and vice versa.
Sensitivity is the ratio or percentage of a
probability that a test result will be positive when
the diagnosis is present, also known as true
positive rate (TPR), defined as:

+
=
D
TP
TPR y Sensitivit :
(3)

Specificity is the ratio or percentage of a
probability that a test result will be negative when
the disease is not present and also known as true
negative rate (TNR), defined as:

÷
=
D
TN
TNR y Specificit :
(4)

4. Methodology

4.1 Data Collection

The data were obtained from the previous work
[20]. For the first group, the severity of the DHF
is classified into grade I to IV, according to WHO
recommendation [1]. Acute dengue infection was
confirmed subsequently by the use of ELISA to
detect elevated dengue specific IgM (primary
infection) and IgG (secondary infection) [21].
Patient serum samples were tested for hemoglobin
determination using an automated counter (Coulter
STKS machine). The second group is the control
group for healthy female and male subjects.
The second group of patients (control subjects)
who do not have past medical history of dengue
were recruited and studied using the same
guidelines as in the BIA subject preparation used
for the first group [20]. The BIA safety
measurements procedure and other safety
precautions were made known to the subjects and
their informed consent was obtained from each
subject prior to the BIA measurement.
For the control subject, the weight was taken once.
However for subjects with dengue infection, the
weight was measured daily until upon discharged.

4.2 Clinical Experiments

One of the clinical methods in making dengue
diagnosis is to establish the clinical history-taking,
physical examination and investigation. Each
patient undergoes detailed history taking, physical
examinations and blood investigations following
their admission. Clinical evaluations and
haematological investigations are conducted
continuously until they are discharged.
The patients were also admitted at different
stages of their illness, thus it is important to have
the results of clinical signs and symptoms, blood
investigations, and other analyses dated with a
consistent and proper reference point [20].
Nevertheless, thorough documentation of
symptoms and blood investigations do not offer
definitive advantage in the management and
monitoring of dengue cases. A more useful
measure is to develop a complete day-to-day
profile of clinical manifestations and blood
investigations made according to a proper
reference point based on the „Fever day‟ definition
[20]. This is to ensure that the data used in the
analysis will refer to a common reference point,
regardless of how many days of fever the patient
has experienced
The Hb status of control subjects cannot be
determined at a low frequency of 50 kHz, since the
membranes of blood cells will act as insulators
[22]. In DHF patients however, pathophysiological
changes caused by the dengue infection lead to a
plasma leakage. And this in turn causes low
thrombocytopenia and coagulopathy [1]. It is
therefore possible to estimate the Hb volume
indirectly using the BIA technique.

4.3 BIA Experiments

The bioelectrical impedance experiments are
conducted using the bioimpedance analyzer. It is
important to note that there is no historical or
clinical evidence that bioimpedance testing is
unsafe, even for pregnant women or persons with
pre-existing heart conditions. During the years
2001 and 2002, two hundred and ten adult patients
aged twelve years old and above, with serological
confirmation (WHO 1997) of acute dengue
infection, admitted in HUKM (Hospital Universiti
Kebangsaan Malaysia), Malaysia were
prospectively studied. At present, the knowledge
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acquisition to present pattern to classify the
dengue infections is limited to the clinical
symptoms and signs. Thus, only clinical symptoms
were used as the input data for classify the dengue
infections.
A total of one hundred and forty two
volunteers with no past medical history were
recruited and studied as the control subjects. For
the control subject the weight was taken once,
however for subjects with dengue infection the
weight was measured daily until upon discharged.
The statistical analysis was performed using SPSS
statistical package version 10.01 for Window
1998. Simple linear regression was used in the
preliminary analysis for testing the significance of
the variables. These variables were then included
in the multivariate analysis. Multiple linear
regression was used to analyse the control effects
of the patient demographic and symptom variables
and BIA parameters on Hb. The model was
constructed in three steps as follows:
a. When correlation exits between variables,
one or more variables were excluded for
the multivariate analysis.
b. The demographic variables were first
included in the model. Once the
demographic predictors were identified,
add in the BIA parameters and find,
which of these parameters were important
predictors.
c. The last step was to include symptom and
find out whether with the addition of this
predictor will make further significant
contribution or not.
The last step was to include symptom and find
out whether with the addition of this predictor will
make further significant contribution or not.
Only five variables are highly significant
which gender, weight, reactance (Xc), vomiting
and day of fever [20, 23-25].
These predictors will be the inputs for linear and
nonlinear system identification based on ANN. All
the inputs data for these models were normalized
from „0‟ to „1‟. Only for linear and nonlinear
system identification based on ANN the output
data were categorize into 2 parts, for classifying
the dengue infections disease which is 0 for no
dengue infection, while 1 for dengue infections.
Then, the input data were divided randomly,
between 2 sets: a training set and a testing set.
These five input variables were fed into the FFNN
and trained using LM algorithm.
During this process, the NAR application was
optimized via four steps where each of these steps
was implemented to find optimum value for the
model order, the number of hidden layers,
maximum iterations, and lastly the number of
parameters regularization. At each experiment, the
respective parameter to be optimized was varied
while the other three were fixed. Selection of the
optimum parameter value for each step was based
on the performance evaluation of the model
through the final prediction error (FPE) analysis as
well as the diagnostic accuracy (DA). For
simplicity, threshold for the output logic levels
was fixed to 0.5 for each models used in this work.
At the next stage, the most appropriate threshold
level would be decided by analyzing the minimum
Euclidean Distance (ED) values from the receiver
operating characteristic (ROC) plot.
Finally, the area under the ROC curve was
applied to measure the accuracy of dengue
hemoglobin status in the diagnostic test.

4.4 Experiment for NAR Model

These experiments were designed to give better
accuracy than the previous experiments (linear
model). These experiments processes (data
preprocessing, model design, model estimation
and model validation) are described in next
section.
i. Data Preprocessing
Two matrices were generated from the
data collection: training, and test set.
These data were then divided randomly
into two sets: a training set, and a testing
set to ensure that it generalizes well. All
data were normalized so that that the
dataset has zeroed mean and uniform
standard deviation.
The training data was used to guide MLP
weight updates during training. The test
set was used to test the performance of
the MLP.

ii. Model Design for Nonlinear Model
For nonlinear models, NAR, was used to
monitor the progression of dengue
infection based on hemoglobin. Input
variables were fed into the feedforward
ANN and trained using Levenberg-
Marquardt algorithm. The number of
hidden layers was set to be between 1 to
10 units. The number was chosen so as
to reduce time consumption in training
the data, and network overfitting [15]. A
transfer function for neurons in the
hidden layers is hyperbolic tangent
sigmoid and the single neuron in the
output layer has a linear transfer function.
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There were two approaches considered in
this study, unregularized and regularized
approach. Unregularized approach is the
normal method used for training the
networks. For the regularized approach,
it was shown that one way of controlling
the average generalization error was to
extend the criterion with a term called
regularization by simple weight decay.
The weight decay reduced the variance
error at the expense of a higher bias error.
Nørgaard [15] showed that the value was
obtained on validation data set when
regularized approach was used. Figure 4
illustrates this approach.

iii. Model Estimation
The MLP application was optimized via
four steps, each of which was
implemented to find the optimum value
for the number of neurons in the hidden
layer, training iterations and
regularization parameters. In each step,
the parameter to be optimized is varied,
while the other two are fixed. Selection of
the optimum parameter value for each
step was based on the performance of the
model through the FPE analysis as well
as DA. For simplicity, threshold for the
output logic levels was fixed to 0.5 for
each model used in this initial work. The
best model for the experiment was then
selected for the final application.

iv. Validation of Nonlinear Models
In this stage, the most appropriate
threshold level was decided by analyzing
the minimum ED values from the ROC
plot. Finally the AUC was applied to
measure the accuracy of dengue
hemoglobin status in diagnostic test.

5. Results
5.1 Dengue Data
During the year 2001 to 2002, two hundred and
ten adult patients aged 12 to 83 years old,
suspected of DF and DHF admitted to the
Universiti Kebangsaan Malaysia Hospital
(HUKM), were monitored. The dengue infection
was also confirmed serologically by detection of
IgM antibody using the ELISA method. For all
the 210 dengue patients studied, 119 (56.7%) were
male and 91 (43.3%) were females.
The sample size of the female was more than the
male for DF by 4 patients. However, for DHF I
the males exceeded the females by 11; the males
increased by 22 compared to females in DHF II
and there was only one female DSS patient. In the
age distribution, the majority were mainly in the
15-24 years group age (35.71%), followed by the
25-34 years group age (25.24%). Those aged
between 35-44 years constituted 20% for all cases.
This indicates that the majority of the patients
were teenagers and young adults, whom were
more likely to be involved in outdoor activities
and thus more likely to be exposed to the danger
of dengue infection.

5.3 Bioelectrical Impedance Analysis
In the analysis of bioelectrical tissue
conductivity (BETC) parameters for the healthy
subjects, it was found that body capacitance (BC)
and phase angle (o) were lower in the female
subjects compared to their male counterparts
(Table 2). On the other hand, resistor (R) and
reactance (X
c
) were higher in females than in
males. A similar trend for the BETC parameters
was also observed in dengue patients, where a
higher o and BC values were found in males, and
a higher R and X
c
values were found in females.
For example, on „Fever day 0‟, the mean o for
male was 6.69±0.91° and female was 5.45±1.02°,
while the mean BC was 821.24±187.58pF and
516.82±112.93pF for males and females,
respectively. However, the female R
(592.14±93.90O) and X
c
(56.92±15.73O) were
higher than the male R (462.77±76.81O) and X
c

(54.02±11.15O), respectively (Table 2).

5.4 Control Data
The healthy control data, a total of 144
volunteers with no past medical history were
analyzed. The patients were between the ages of
13 to 60 years old, and 53 (37%) were males and
91 (63%) were females. The majority of the
confirmed patients were Malays (95 or 66.0%),
followed by Chinese with 36 patients (25.0%),
Indian with 3 (2.0%) and others with 10 (7.0%).
In the age distribution, the majority were mainly in
the 15-24 years group age (35.71%), followed by
the 25-34 years group age (25.24%). Those aged
between 35-44 years constituted 20% for all races.

5.5 Experiment for Statistical Analysis
Correlations between variables were analyzed
using Spearman‟s correlation coefficient. It is a
standardized measure of the strength of the
relationship between two variables that does not
rely on the assumptions of a parametric test. A
matrix is displayed giving the correlation
H.Adbul Rahim,F.Ibrahim,M.N.Taib, Int. J. Comp. Tech. Appl., Vol 2 (1), 207-215
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coefficient between the two variables such as
gender and height (0.647), underneath is the
significant values of the coefficient (0.000) and
finally the sample size (210) . The significant
value for this correlation coefficient is less than
0.05. Therefore, it can be concluded that there is a
significant relationship between the gender and
height.
Linear regression was used to identify the most
significant variable among the bioelectrical
impedance analysis parameters. The significant
variables were resistance and reactance (p<0.05).
Table 3 shows the model parameters. This model
includes nine variables predicting the Hb, but only
four variables are highly significant.
The best model produced by the multilinear
regression using four variables (gender, weight,
reactance and vomiting) only yields an accuracy of
43%. This model can be written as follows:
c + +
+ + + =
) ( 19 . 0
) ( 047 . 0 ) ( 029 . 0 ) ( 309 . 1 012 . 6
vomiting
reactance weight gender Hb
(19)
where,
gender = 0 for female and 1 for male
weight =weight of patients in kg
react. = reactance of patients in ohm
vomiting = 1 for sign of vomit and 0 for no sign of
vomit,
c = error term

5.6 AR Experiment
Three types of input variables, which consisted
of a list of dengue clinical symptoms,
physiological and BIA parameters, were used in
the AR Experiments. These input variables were
analysed and evaluated using SPSS based on the
hemoglobin concentration.

5.6.1 Data Preprocessing
210 patients were monitored over a period of 4
succeeding days, depending on their severity and
duration of stay in the hospital. The patients‟
symptoms, BIA parameters and physiological data
were monitored daily to form a unique set of
samples, and producing a total of 781 samples. All
data were normalized from „0‟ to „1‟. These data
were then divided randomly into two sets: a
training set consisting of 527 samples, and a
testing set of 254 samples. Each case was
arranged as column vectors in the datasets.
The results show that there were only one
symptom (vomiting), two physiological data
(gender and weight) and one BIA parameter
(reactance) which were significant based on
Experiment for SPSS. These predictors were
subsequently used as inputs for Experiment for
NAR. „Fever day 0‟ to „Fever day +3‟ were
important references for the physiological changes
in the clinical symptoms. All of these parameters
were employed as the inputs for the system
identification experiments.

5.6.2 Model Design
The model order was chosen using the
Lipschitz number, FPE and AIC order selection
criteria. Figure 5 illustrate Lipschitz number plots
for five input variables (vomiting, gender, weight,
day of fever and reactance) of dengue patients.
From Figure 5, the optimal number of regression
as the knee point of the curve was 4, so that the
value of the model order was n
a
=4.

5.6.3 Model Estimation
Figure 6 shows the Lipshitz number criterion
for finding the neuron number in hidden layer. It
can be seen that the DA line shows increasing
trend at 3 neurons. Increasing the neurons after
this did not improve the model effectiveness in
recognizing the test data set despite the increasing
trend of FPE. Thus, the network model that was
iterated for 2 neurons and showed maximum
accuracy (83.52%) is selected with the least value
of error (0.071).
The iteration is also based on the highest DA
and the least value of error. Figure7 illustrates the
model performance for finding the best iteration
and the DA reached its maximum (91.21%) when
500 iterations were used, using Lipschitz number
criterion.
These three steps are usually used for
unregularized method. An addition of an extra
step is necessary to find the best regularization
parameters. The best regularization parameter
selected was 0.0001 because the DA is 85.71%
(reasonably high) and the value of the FPE was
0.064 (the least), hence meeting the maximum
iteration (500) as shown in Figure 8.
Table 4 tabulates the summary of the parameters
of NAR model for the different types of model
order criteria.

5.6.4 Model Validation for NAR Experiment
In general, Table 5 shows the different number of
the model order using different types of criteria
and the AUC performance. From this table, it was
found that the Lipschitz number criterion for
regularized approach produced the highest
accuracy (80.60%) for the NAR model.
The model order, as given by the Lipschitz
number criterion, was tested using Neural
Network-based AR model. The overall
H.Adbul Rahim,F.Ibrahim,M.N.Taib, Int. J. Comp. Tech. Appl., Vol 2 (1), 207-215
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8
performance of NAR model diagnosis is as shown
in Table 6.
For Lipschitz number criterion, the diagnostic
accuracy of 86.81% was achieved for the
unregularized method, whereas a small proportion
of diagnostic error 13.19% has been observed for
the total test group of 210 subjects. An 87.14%
sensitivity, 85.71% specificity and 95.31% of
positive prediction were evaluated for the designed
model structure. The area under the ROC curve
(AUC) was 76.2%. The regularized method
illustrates 85.71% of accuracy in diagnosis while
14.29% is the indicated diagnostic error. Overall,
the designed model structure has 87.14%
sensitivity, 80.95% specificity and the positive
prediction was 93.84%. The performances were
measured based on the receiver operating
characteristic (ROC) curves.
The overall performance of NARX model with
unregularized approach is as shown in Table 6.
The area under the ROC curve (AUC) was 76.20%
is shown in Figure 9 (Lipschitz number). The
closest ED is depicted from the ideal point (0,1) as
0.19 when the optimized model has a threshold of
0.4.
The ROC curve for the Lipschitz number
criterion with regularized approach is shown in
Figure 10. The total AUC can be derived by
combining the individual area with respect to the
labeled thresholds in the figure. For Lipschitz
number criterion, AUC is 80.6%. The closest ED
is depicted from the ideal point (0,1) as 0.23 when
the optimized model has a threshold of 0.4.

6. Conclusions

Using SPSS analysis, it was found that the
work presented has successfully modeled
heamoglobin status using selected physiological
parameters (i.e. gender, vomiting, weight and day
of fever) and BIA parameters (i.e. reactance).
The best model produced by the multilinear
regression using four variables (gender, weight,
reactance and vomiting) only yields an accuracy of
43%. This model can be written as follows:
c + +
+ + + =
) ( 19 . 0
) ( 047 . 0 ) ( 029 . 0 ) ( 309 . 1 012 . 6
vomiting
reactance weight gender Hb
NAR model has produced AUC of 72.60%
using Lipschitz number with unregularized
method but the AUC was improve by using the
regularized method (80.60%)
The model accuracies in predicting the
haemoglobin status, to indicate the dengue
progressions, ranges from 43% (using the
multilinear regression) to 80.60% (using NAR
model).

Acknowledgements
The authors are indebted to Universiti Teknologi
Malaysia for financial supports.